Multidimensional Inverse Problems for Differential EquationsSpringer, 21 Ara 1970 - 59 sayfa |
Kitabın içinden
5 sonuçtan 1-3 arası sonuçlar
Sayfa 10
... derive the following moments for ( 246 ) where So , t λ1 12 ... Su ( x , s ) x 11.x2 So , t is a sphere of radius t λη xn dw , can use equation u ( x , s ) : ( λ = 0,1,2 , ... ) , ( 1 = 1,2 , ... , n ) 1 with center at the origin ...
... derive the following moments for ( 246 ) where So , t λ1 12 ... Su ( x , s ) x 11.x2 So , t is a sphere of radius t λη xn dw , can use equation u ( x , s ) : ( λ = 0,1,2 , ... ) , ( 1 = 1,2 , ... , n ) 1 with center at the origin ...
Sayfa 16
... derive the formula ( 6 ) 2 j ' we can easily Rx ( r‚p ) = { } √r = p + r2 [ { vg ( r , p ) + ( r − p ) 31 « g ( r , p ) ] 2 ' Σ J = 1 • exp [ 1k ( -1 ) , ( r , p ) √r - p ] It is apparent from this that D { O < p ≤ r≤ 1 } together ...
... derive the formula ( 6 ) 2 j ' we can easily Rx ( r‚p ) = { } √r = p + r2 [ { vg ( r , p ) + ( r − p ) 31 « g ( r , p ) ] 2 ' Σ J = 1 • exp [ 1k ( -1 ) , ( r , p ) √r - p ] It is apparent from this that D { O < p ≤ r≤ 1 } together ...
Sayfa 31
... derive the formula dw U2 ( M , M11t ) = = = 2 [ E2 = = 2 ( M , M ; ) ] SS a ( P ) r2 ( P , M ) du u1 ( 1 ) • 4. SSS DM , 4 п 1 2 [ t [ t2 - r2 ( M , M ) ] 2 2 SM , t a ( P ) u1 ( P , M , t - r ( P , M ) ) r ( P , M ) dvp DM , t SM , t ...
... derive the formula dw U2 ( M , M11t ) = = = 2 [ E2 = = 2 ( M , M ; ) ] SS a ( P ) r2 ( P , M ) du u1 ( 1 ) • 4. SSS DM , 4 п 1 2 [ t [ t2 - r2 ( M , M ) ] 2 2 SM , t a ( P ) u1 ( P , M , t - r ( P , M ) ) r ( P , M ) dvp DM , t SM , t ...
Diğer baskılar - Tümünü görüntüle
Multidimensional Inverse Problems for Differential Equations M. M. Lavrentiev,V. G. Romanov,V. G. Vasiliev Metin Parçacığı görünümü - 1970 |
Sık kullanılan terimler ve kelime öbekleri
absolutely integrable functions Akad analytic function belong boundary conditions CAUCHY data chapter coefficients consider const continuous function coordinates corresponding cosk Denote derive determining a function differential equation Dokl domain earth's ellipses ellipsoid of revolution expression family of curves following theorem function u(r fundamental solution given GREEN'S function half-plane half-space HÖLDER condition hyperplane inequality 18 integral equation integral geometry integral-geometric problem Introduce the notation inverse kinematic inverse kinematic problem inversion formula kernel Lavrentiev linearized inverse problem multidimensional inverse problems Nauk SSSR obtain parameters polar potential theory problem for equation problem of determining Problems for Differential R₁ R₂ right-hand side ROMANOV satisfies second kind SM,t solution to equation take FOURIER transforms telegraph equation two-parameter family unique solution uniqueness theorem unit circle variables VOLTERRA equation waves wxxx